1. Geology 5660/6660 Applied Geophysics 17 Jan 2014 © A.R. Lowry 2014 Read for Wed 22 Jan: Burger 21-60 (Ch 2.2–2.6) Last time: The Wave Equation; The Seismometer The elastic wave equation :  Assumes an isotropic solid  Assumes elastic constitutive law  = c   Stress/strain relations assume infinitesimal strain  Rheology is linear elastic: (Hooke’s Law)  The wave equation : Velocities are more sensitive to &  than to  ; are sensitive to porosity, rock composition, cementation, pressure, temperature, fluid saturation

2. Seismic ground motions are recorded by a seismometer or geophone. Basically these consist of: A frame, hopefully well-coupled to the Earth, Connected by a spring or lever arm to an Inertial mass. Motion of the mass is damped, e.g., by a dashpot. Electronics convert mass movement to a recorded signal (e.g., voltage if mass is a magnet moving through a wire coil or vice-versa). Instrumentation M frame spring mass dashpot

3. isometric view cross-sectional view Geophone : Commonly-used by industry, less often for academic, seismic reflection studies Often vertical component only Often low dynamic range Undamped response of mechanical system Response after electronic damping 10 Hz “natural frequency” 1010020500200 A Seismometer differs mostly in cost/ componentry… 3-c, > dynamic range

4. Recall that an idealized mass on a spring is a harmonic oscillator : Position x of the mass follows the form x = A cos (  t +  ) where A is amplitude, t is time,  is the natural frequency of the spring, and  is a phase constant (tells us where the mass was at reference time t = 0). x A T = 2  /  In the frequency domain this is a delta-function :  Understanding the Frequency Domain:

5. Signal recorded by a seismometer is a convolution of the wave source, the Earth response, and the seismometer response. Wave Source Earth Response Seismometer Response where  denotes convolution: Example: = So, want seismometer response to look as much as possible like a single delta-function in time: t = 0    

6. Seismometer response is given by: where i is current,  0 is “natural frequency” of the spring-mass system oscillation, K is electromagnetic resistance to movement of the coil, R is electrical resistance to current flow in the coil, & x is movement of the coil relative to the mass. The damping factor h is given by: where  is the mechanical damping factor. Hence we choose K and R to give a time response that looks as much as possible like a delta-function (= a flat frequency response):

7. This corresponds to  0 / h = 1: Critical damping Critically Damped Overdamped Underdamped Seismometers typically are designed to be slightly overdamped (  0 / h = 0.7).

8. Seismometer Damping Source Function An explosion at a depth of 1 km & t = 0 is recorded by a seismometer at the surface with the damping response shown. What will the seismogram look like? V = 5 km/s

9. (Note: for really big signals, can get more robust operation and lower frequencies from other types of instruments… E.g. GPS!) 4 April 2010 M7.2 Baja California earthquake

10. (Note: for really big signals, can get lower frequencies from other types of instruments… E.g. GPS!) 10 August 2009 M7.6 earthquake north of Andaman GPS Displacement Seismometer Displacement

11. Huygen’s Principle : Every point on a wavefront can be treated as a point source for the next generation of wavelets. The wavefront at a time  t later is a surface tangent to the furthest point on each of these wavelets. We’ve seen this before… This is useful because the extremal points have the greatest constructive interference

12. Fermat’s Principle (or the principle of least time ): The propagation path (or raypath ) between any two points is that for which the travel-time is the least of all possible paths. Recall that a ray is normal to a wavefront at a given time: A key principle because most of our applications will involve a localized source and observation at a point (seismometer).

13. V = fast V = slow least time in slow least time in fast Fermat’s principle leads to Snell’s Law : Travel-time is minimized when when the ratio of sines of the angle of incidence  (angle from the normal) to a velocity boundary is equal to the ratio of the velocities, i.e., straight line least time 